Textbook Question
Shared Birthdays Find the probability that of 25 randomly selected people, at least 2 share the same birthday.
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Ch. 4 - Probability
Triola14th EditionElementary StatisticsISBN: 9780137366446
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Table of contents
- Ch. 1 - Introduction to Statistics88
- Ch. 2 - Exploring Data with Tables and Graphs70
- Ch. 3 - Describing, Exploring, and Comparing Data66
- Ch. 4 - Probability112
- Ch. 5 - Discrete Probability Distributions109
- Ch. 6 - Normal Probability Distributions122
- Ch. 7 - Estimating Parameters and Determining Sample Sizes107
- Ch. 8 - Hypothesis Testing75
- Ch. 9 - Inferences from Two Samples94
- Ch. 10 - Correlation and Regression80
- Ch. 11 - Goodness-of-Fit and Contingency Tables29
- Ch. 12 - Analysis of Variance42
Chapter 4, Problem 4.4.15
Jumble Many newspapers carry “Jumble,” a puzzle in which the reader must unscramble letters to form words. The letters MHRHTY were included in newspapers on the day this exercise was written. How many ways can those letters be arranged? Identify the correct unscrambling, then determine the probability of getting that result by randomly selecting one arrangement of the given letters.
Verified step by step guidance1
Step 1: Understand the problem. We are tasked with determining the total number of arrangements of the letters MHRHTY and then calculating the probability of correctly unscrambling the letters to form a specific word. This involves concepts of permutations and probability.
Step 2: Calculate the total number of arrangements of the letters. Since the letters MHRHTY include a repeated letter (H appears twice), the formula for permutations of a multiset is used: \( \frac{n!}{k_1! \cdot k_2! \cdot \ldots \cdot k_r!} \), where \( n \) is the total number of letters, and \( k_1, k_2, \ldots, k_r \) are the frequencies of repeated letters. Here, \( n = 6 \) and \( k_H = 2 \).
Step 3: Apply the formula for permutations. Substitute \( n = 6 \) and \( k_H = 2 \) into the formula: \( \frac{6!}{2!} \). This will give the total number of unique arrangements of the letters.
Step 4: Identify the correct unscrambling of the letters. The correct word formed by unscrambling MHRHTY is 'MYTHHR'. This is one specific arrangement out of the total number of arrangements calculated in Step 3.
Step 5: Calculate the probability of randomly selecting the correct arrangement. The probability is given by \( P = \frac{1}{\text{Total Arrangements}} \). Use the total number of arrangements from Step 3 to compute this probability.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Permutations
Permutations refer to the different ways in which a set of items can be arranged. In this case, the letters MHRHTY can be rearranged in various orders. The formula for calculating permutations of n items, where some items may be identical, is n! / (n1! * n2! * ... * nk!), where n is the total number of items and n1, n2, ..., nk are the counts of each identical item.
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Introduction to Permutations
Factorial
A factorial, denoted as n!, is the product of all positive integers up to n. It is a fundamental concept in combinatorics used to calculate permutations and combinations. For example, 5! equals 5 × 4 × 3 × 2 × 1 = 120. Understanding factorials is essential for determining the total arrangements of letters in the puzzle.
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Probability
Probability is the measure of the likelihood that a particular event will occur, expressed as a ratio of favorable outcomes to the total number of possible outcomes. In this context, once the total arrangements of the letters are calculated, the probability of randomly selecting the correct unscrambled word can be found by dividing the number of favorable outcomes (1, for the correct word) by the total arrangements.
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5:37Introduction to Probability
Related Practice
Textbook Question
Unseen Coins A statistics professor tosses two coins that cannot be seen by any students. One student asks this question: “Did one of the coins turn up heads?” Given that the professor’s response is “yes,” find the probability that both coins turned up heads.
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Textbook Question
California Lottery Let A denote the event of placing a \$1 straight bet on the California Daily 4 lottery and winning. There are 10,000 different ways that you can select the four digits (with repetition allowed) in this lottery, and only one of those four-digit numbers will be the winner. What is the value of P(A)? What is the value of P(Abar)?
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Textbook Question
Language: Complement of “At Least One” Let A=the event of getting at least one defective calculator when four are randomly selected with replacement from a batch. Write a statement describing event A
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Textbook Question
In Exercises 13–20, express the indicated degree of likelihood as a probability value between 0 and 1.
Square Peg Sydney Smith wrote in “On the Conduct of the Understanding” that it is impossible to fit a square peg in a round hole.
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Textbook Question
Composite Drug Test Based on the data in Table 4-1, assume that the probability of a randomly selected person testing positive for drug use is 0.126. If drug screening samples are collected from 5 random subjects and combined, find the probability that the combined sample will reveal a positive result. Is that probability low enough so that further testing of the individual samples is rarely necessary?
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